Iterative methods for the numerical solution of mixed finite element approximations of the Stokes problem

This paper deals with a non-overlapping domain decomposition method (DDM) for solving the continuous- pressure mixed finite element formulations of the Stokes equations.. The

However, no error estimates for the finite element approximations and theoretical convergence analysis of the method of successive approximation were given.. In this paper we show

We also quote two arguments which are of great help for the proof of this inf-sup condition: the Boland and Nicolaides idea [4] consists in proving this condition separately on

By using this technique and establishing a multi-parameter asymptotic error expansion for the mixed finite element method, an approximation of higher accuracy is obtained

It has been shown that these techniques and arguments are powerful for convergence analysis especially for improving accuracy analysis in mixed finite element methods for solving

Abstract — We propose and analyze some itérative algonthms for mixed finite element methods for second-order elhptic équations The method is based on some multilevel décompositions

Abstract — We consider a mixed finite element method for the Stokes problem in a polygonal domain Q cz U 2 An inf-sup condition is established which fits into the abstract jramework

Based on the variational formulation of the simply supported plate problem given in Problem (P*) we now consider the following finite element approxi- mation scheme..